On groups of finite upper rank
Abstract
The `upper rank' of a group is the supremum of the (Pr\"ufer) ranks of its finite quotients, and for a prime p, the `upper p-rank' is the supremum of the sectional p-ranks of those quotients. The former is finite if and only if the latter are finitely bounded as p ranges over all primes (a deep fact). Here we discuss the question: if the upper p-ranks of a finitely generated group G are all finite, are they necessarily bounded? The case where G is a soluble group is still an open problem.
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